Color critical hypergraphs with many edges

V. Rödl; M. Siggers

doi:10.1002/jgt.20166

Color critical hypergraphs with many edges

V. Rödl
, M. Siggers

Emory University

Research output: Contribution to journal › Article › peer-review

5 Scopus citations

Abstract

We show that for all k ≥ 3, r > l ≥ 2 there exists constant c = c(/c, r, l) such that for large enough n there exists a k-color-critical r-uniform hypergraph on less than n vertices, having more than cn′ edges, and having no l-set of vertices occuring in more than one edge.

Original language	English
Pages (from-to)	56-74
Number of pages	19
Journal	Journal of Graph Theory
Volume	53
Issue number	1
DOIs	https://doi.org/10.1002/jgt.20166
State	Published - Sep 2006

Keywords

Color critical dense hypergraph
Minimal partial steiner system

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10.1002/jgt.20166

Cite this

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title = "Color critical hypergraphs with many edges",

abstract = "We show that for all k ≥ 3, r > l ≥ 2 there exists constant c = c(/c, r, l) such that for large enough n there exists a k-color-critical r-uniform hypergraph on less than n vertices, having more than cn′ edges, and having no l-set of vertices occuring in more than one edge.",

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author = "V. R{\"o}dl and M. Siggers",

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AU - Rödl, V.

AU - Siggers, M.

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AB - We show that for all k ≥ 3, r > l ≥ 2 there exists constant c = c(/c, r, l) such that for large enough n there exists a k-color-critical r-uniform hypergraph on less than n vertices, having more than cn′ edges, and having no l-set of vertices occuring in more than one edge.

KW - Color critical dense hypergraph

KW - Minimal partial steiner system

UR - https://www.scopus.com/pages/publications/33748476054

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M3 - Article

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VL - 53

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EP - 74

JO - Journal of Graph Theory

JF - Journal of Graph Theory

IS - 1

ER -

Color critical hypergraphs with many edges

Abstract

Keywords

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